Mathematical Modelling and Analysis (Dec 2013)

Three-layer approximation of two-layer shallow water equations

  • Alina Chertock,
  • Alexander Kurganov,
  • Alexander Kurganov,
  • Zhuolin Qu,
  • Tong Wu

DOI
https://doi.org/10.3846/13926292.2013.869269
Journal volume & issue
Vol. 18, no. 5

Abstract

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Two-layer shallow water equations describe flows that consist of two layers of inviscid fluid of different (constant) densities flowing over bottom topography. Unlike the single-layer shallow water system, the two-layer one is only conditionally hyperbolic: the system loses its hyperbolicity because of the momentum exchange terms between the layers and as a result its solutions may develop instabilities. We study a three-layer approximation of the two-layer shallow water equations by introducing an intermediate layer of a small depth. We examine the hyperbolicity range of the three-layer model and demonstrate that while it still may lose hyperbolicity, the three-layer approximation may improve stability properties of the two-layer shallow water system.

Keywords